Application of Special Functions in One Dimensional ... · Gimel-function to obtain an analytic...
Transcript of Application of Special Functions in One Dimensional ... · Gimel-function to obtain an analytic...
Application of special functions in one dimensional advective diffusion problem
1 Teacher in High School , FranceE-mail : [email protected]
ABSTRACTIn the present paper, we construct an one dimensional advective diffusion model problem to evaluate the substance concentration distribution along
axis between and Here, the diffusivity of the substance and the velocity of the solvent flow are both considered as a variable.Kumar and Satyarth [6] use the product of the class of multivariable polynomials and the multivariable H-function defined here to obtain the analyticsolution. Then, we employ the product of the generalized hypergeometric function, class of multivariable polynomials and the multivariableGimel-function to obtain an analytic formula of our problem. Finally, some particular cases will be given.
Keywords :Multivariable Aleph-function, , classes of multivariable polynomials, generalized hypergeometric function, advective-diffusion modelproblem, expansion formula, multivariable Gimel-function.
2010 Mathematics Subject Classification. 33C99, 33C60, 44A20
1.Introduction and preliminaries.
. We consider a generalized transcendental function of several complex variables, called Gimel fnction.
= (1.1)
with
The following quantities and are defined by Ayant[2].
Following the lines of Braaksma ([3] p. 278), we may establish the the asymptotic expansion in the followingconvenient form :
,
, where :
and
In your investigation, we shall use the following notations.
(1.2)
(1.3)
(1.4)
(1.5)
(1.6)
(1.7)
An advective diffusion is a process where solute particles in a solvent are diffused and transported with the flow ofsolvent. If represents be the concentration of the diffusing substance, denotes the diffusivity of the substance,
is the velocity of the solvent flow and is the externel source function, then the governing advective-diffusionequation is given by ( see Harrison and Perry [5], Hanna et al. [4], Lyons et al [7])
(1.8)
Here, we construct an one dimensional advective-diffusion model problem in which the diffusivity of the substance isconsidered as a variable of position and the velocity of the solvent flow is supposed to be function of . There is nogeneration or absorption of the solute in the solvent.
The class of multivariable polynomials defined by Srivastava [11], is given in the following manner :
(1.9)
On suitably specializing the above coefficients , On suitably specializing the above coefficients , yields some of known polynomials, these yields some of known polynomials, these include the Jacobi polynomials, Laguerre polynomials, and others polynomials ([1include the Jacobi polynomials, Laguerre polynomials, and others polynomials ([144],p. 158-161)],p. 158-161)
We shall use the following notation
(1.10)
2. Statement of the problem and governing equation
Let us consider an advective-diffusion process in which the solute particles in a solvent are diffused and transportedwith the variable velocity of the solvent flow in the direction of the axis between the limits to andthat is supposed to be a function of position and proportional to
the diffusivity of the substance (solute) is a function of position and is proportional to . Theexternel source function is absent in the process that is there is no generation or absorption of the solute in the solvent.The desired function represents the concentration distribution of the diffusing substance at the position and at
the time . Then due to (1.1), we get an one dimensional advective-diffusion equation in the form given below :
(2.1)
where and are arbitrary non zero proportionality constants, and and.
Let us suppose that the initial concentration of the solute in the solvent is given by
(2.2)
In (2.1), for simplicity, letting and , we get
(2.3)
where where
3. Main integral
In our work, we also require the following integral
Theorem 1.
(3.1)
Provided that
for
and
, where is defined by (1.8).
Proof
To prove (3.1), first expressing the Jacobi polynomial in series , a class of multivariable polynomials defined
by Srivastava [11] in series with the help of (1.14), expressing the generalized hypergeometric in seriesand we interchange the order of summations and -integral (which is permissible under the conditions stated).Expressing the Gimel-function of -variables in Mellin-Barnes contour integral with the help of (1.1) and interchangethe order of integrations which is justifiable due to absolute convergence of the integrals involved in the process. Nowcollecting the powers of and and evaluating the inner -integral. Finally, interpreting the Mellin-Barnescontour integral in multivariable Gimel-function, we obtain the desired result (3.1).
4. Solution of the problem and analysis
To solve the differential equation (2.3), we suppose that in it, we get
(4.1)
and
(4.2)
The solution of the equation (4.1) is (see 10 page 258). Thus by (4.1) and (4.2), we obtain
(4.3)
(4.4)
The general solution of the equation (2.3) is :
and (4.5)
Now making an appeal to (2.2) and taking the expression of (4.5) at , we have
(4.6)
Then to evaluate ; multiply both sides of (4.6) by and then integrate the twosides of (4.6) with respect from to and use the orthogonality of Jacobi polynomials (see, [10, page 258]), weobtain
(4.7)
.
Finally, with the aid of (4.5) and (4.7), we obtain the concentration distribution of the solute in the form
(4.8)
provided and
5. Examples
Let the initial concentration of the solute in the solvent is given by (formal initial condition)
(5.1)
Substituting the value of in (4.8), we obtain the formal solution about this problem
(5.2)
where
(5.3)
Provided that
for
and
,
6. Particular cases
In this section, we shall study two particular cases and we obtain the formal solution concerning the problems.
(i) If in (2.3), then the solvent moves with the constant velocity in the direction of and the theequation (2.3) reduces to
(6.1)
and the solution is
Corollary 1.
(6.2)
where
(6.3)
Provided that
for
and
,
(ii) If we put and in (2.3), the medium is stationary that is and the equation (2.3) reduces to thefollowing equation
(6.4)
and the solution is
Corollary 2
(6.5)
where
(6.6)
Provided that
for
and
,
RemarksWe obtain the same formal solutions concerning the multivariable Aleph- function defined by Ayant [1], themultivariable I-function defined by Prathima et al. [9], the multivariable I-function defined by Prasad [8] and themultivariable H-function defined by Srivastava and Panda [12,13], see Kumar and P.S.Y. Satyarth [6] for more detailsconcerning the multivariable H-function
7. Conclusion
Specializing the parameters of the multivariable Gimel-function, the generalized hypergeometric function and themultivariable polynomials, we can obtain a large number of results of problem of advective-diffusion processinvolving various special functions of one and several variables useful in Mathematics analysis, Applied Mathematics,Physics and Mechanics. The result derived in this paper is of general character and may prove to be useful in severalinteresting situations appearing in the literature of sciences.
References
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